In mathematics, the Perkel graph, named after Manley Perkel, is a 6-regular graph with 57 vertices and 171 edges. It is the unique distance-regular graph with intersection array (6, 5, 2; 1, 1, 3).[1] The Perkel graph is also distance-transitive.
Perkel graph | |
---|---|
Vertices | 57 |
Edges | 171 |
Radius | 3 |
Diameter | 3 |
Girth | 5 |
Automorphisms | 3420 |
Chromatic number | 3 |
Properties | Regular, distance-transitive |
Table of graphs and parameters |
It is also the skeleton of an abstract regular polytope, the 57-cell.
References
edit- ^ Coolsaet, K. and Degraer, J. "A Computer Assisted Proof of the Uniqueness of the Perkel Graph." Designs, Codes and Crypt. 34, 155–171, 2005.
- Brouwer, A. E. Perkel Graph. [1].
- Brouwer, A. E.; Cohen, A. M.; and Neumaier, A. The Perkel Graph for L(2,19). 13.3 in Distance Regular Graphs. New York: Springer-Verlag, pp. 401–403, 1989.
- Perkel, M. Bounding the Valency of Polygonal Graphs with Odd Girth. Can. J. Math. 31, 1307-1321, 1979.
- Perkel, M. Characterization of in Terms of Its Geometry.Geom. Dedicata 9, 291-298, 1980.